PORTALE DELLA DIDATTICA

PORTALE DELLA DIDATTICA

PORTALE DELLA DIDATTICA

Elenco notifiche



Time-domain boundary integral equations: a Convolution Quadrature perspective (didattica di eccellenza)

01VPMRT

A.A. 2020/21

Lingua dell'insegnamento

Italiano

Corsi di studio

Dottorato di ricerca in Matematica Pura E Applicata - Torino

Organizzazione dell'insegnamento
Didattica Ore
Lezioni 20
Docenti
Docente Qualifica Settore h.Lez h.Es h.Lab h.Tut Anni incarico
Falletta Silvia   Professore Associato MATH-05/A 2 0 0 0 1
Collaboratori
Espandi

Didattica
SSD CFU Attivita' formative Ambiti disciplinari
*** N/A ***    
A brief introduction will be given to a background on boundary integral equations for steady state problems and their numerical discretization. Focus will however be on time-domain boundary integral equations (TDBIE) for acoustic scattering problems. After an overview of the Bamberger/Ha Duong analysis of TDBIE, the rest of the course will centre on their numerical discretization. In particular, close attention will be afforded to the numerical analysis and efficient implementation of convolution quadrature as a method for timediscretization of TDBIE taking the original Laplace domain approach of Lubich. The course will end with some more advanced applications such as FEM/BEM coupling and will also cover implementation in open source software such as deltaBEM and BEM++.
A brief introduction will be given to a background on boundary integral equations for steady state problems and their numerical discretization. Focus will however be on time-domain boundary integral equations (TDBIE) for acoustic scattering problems. After an overview of the Bamberger/Ha Duong analysis of TDBIE, the rest of the course will centre on their numerical discretization. In particular, close attention will be afforded to the numerical analysis and efficient implementation of convolution quadrature as a method for timediscretization of TDBIE taking the original Laplace domain approach of Lubich. The course will end with some more advanced applications such as FEM/BEM coupling and will also cover implementation in open source software such as deltaBEM and BEM++.
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Program (main topics) Applications of boundary integral equations in steady state and transient problems. (1 hour) Sobolev spaces and space discretization of boundary integral equations: BEM and collocation (3 hours) Bamberger/Ha Duong analysis of time-domain boundary integral equations (2 hours) Convolution quadrature. Analysis and implementation of both low order (linear multistep) and high-order (Runge-Kutta) schemes. (6 hours) FEM/BEM coupling (3 hours) Modified CQ schemes (1 hours) Large scale implementation (4 hours)
Program (main topics) Applications of boundary integral equations in steady state and transient problems. (1 hour) Sobolev spaces and space discretization of boundary integral equations: BEM and collocation (3 hours) Bamberger/Ha Duong analysis of time-domain boundary integral equations (2 hours) Convolution quadrature. Analysis and implementation of both low order (linear multistep) and high-order (Runge-Kutta) schemes. (6 hours) FEM/BEM coupling (3 hours) Modified CQ schemes (1 hours) Large scale implementation (4 hours)
A distanza in modalità sincrona
On line synchronous mode
Presentazione report scritto
Written report presentation
P.D.2-2 - Marzo
P.D.2-2 - March
Monday March 22nd: 10:00-12:00 Thursday March 25th: 10:00-12:00 Monday March 29th: 10:00-12:00 Monday April 19th: 10:00-12:00 Thursday April 22nd: 10:00-12:00 Monday April 26th: 10:00-12:00 Thursday April 29th: 10:00-12:00 Monday May 3rd: 10:00-12:00 Thursday May 6th: 10:00-12:00 Monday May 10th: 10:00-12:00
Monday March 22nd: 10:00-12:00 Thursday March 25th: 10:00-12:00 Monday March 29th: 10:00-12:00 Monday April 19th: 10:00-12:00 Thursday April 22nd: 10:00-12:00 Monday April 26th: 10:00-12:00 Thursday April 29th: 10:00-12:00 Monday May 3rd: 10:00-12:00 Thursday May 6th: 10:00-12:00 Monday May 10th: 10:00-12:00